[1] 彭振赟,胡锡炎,子空间上对称矩阵反问题,湖南大学学报,2(2002), 5-9
[2] 彭振赟, 矩阵方程ATXA=B的中心对称解及其最佳逼近,长沙电力学院学报,2(2002),3-6.
[3] 彭振赟,Jacobi矩阵逆特征问题存在唯一解的条件,数值计算及计算机应用, 3 (2002),226-232
[4] Zhen-yun Peng,Xi-yan Hu and Lei Zhang, The inverse problem for part symmetric matrices on a subspace,Journal of Computational Mathematics, 4(2003), 505-512。SCI检索号:706XM
[5] 彭振赟, 线性矩阵方程AXB=C的中心对称解及其最佳逼近, 工程数学学报, 6(2003),60-65
[6] Zhen-yun Peng,Xi-yan Hu and Lei Zhang, On the construction of a Jacobi matrix from its mixed-type eigenpairs, Linear Algebra and Its Applications, 362 (2003), 191-200。SCI检索号:648MH
[7] Zhen-yun Peng and Xi-yan Hu,The reflexive and anti-reflexive solutions of the matrix equation AX=B, Linear Algebra and Its Applications, 375(2003), 147-155。SCI检索号:739JE
[8]. Zhen-yun Peng, Least square solutions of matrix equation AXB=E over reflexive matrices X .The Sixth International Conference on Matrix Theory and its Applications in China. Heilongjiang Daxue Ziran Kexue Xuebao 21:4 (2004), 95–98.
[9] Zhen-yun Peng and Xi-yan Hu,The Generalized Reflexive Solutions of the Matrix Equations AX=D and AXB=D, Numerical Mathematics A Journal of Chinese Universities English Series (supplement),12(2003),94-98
[10] Ya-bo Chen, Yu-yuan Zhou, Zhen-yun Peng, A class of inverse problem for matrices on subspace. Natur. Sci. J. Xiangtan Univ.25(2003), no. 2,122–126.
[11] 彭振赟,胡锡炎,张磊,对称次反对称矩阵的一类反问题,高等学校计算数学学报, 2(2003), 144-152
[12] 彭振赟, 一类可对称化矩阵反问题的最小二乘解, 数值计算及计算机应用, 3(2004),119-224
[13] 彭振赟,矩阵方程 AXB=E 的最小二乘自反解(英文), 黑龙江大学学报, 21:4(2004),95-98。
[14] Zhen-yun Peng,Xi-yan Hu and Lei Zhang, The inverse problem of bisymmetric matrices with a submatrix constraint, Numerical Linear Algebra with Applications, 1(2004), 59-73。SCI检索号:771XQ
[15] Zhen-yun Peng,Xi-yan Hu and Lei Zhang, The inverse problem of centrosymmetric matrices with a submatrix constraint, Journal of Computational Mathematics, 4(2004), 535-544。SCI检索号:841AP
[16] Zhen-yun Peng,Xi-yan Hu and Lei Zhang, The nearest bisymmetric solutions of linear matrix equations, Journal of Computational Mathematics, 6(2004), 873-880。SCI检索号:874KV
[17]. Jinwang Liu, Jinjun Hou, Zhenyun Peng, Wensheng Cao, The universal Groebner basis under composition. J. Syst. Sci. Complex. 18:3 (2005), 375–382.
[18] Jin-Jun Hou, Zhenyun Peng, Xu-Li Han, The solvability conditions for the inverse problem of symmetrizable nonnegative definite matrices. JP J. Algebra Number Theory Appl. 5:1 (2005), 163–172.
[19] 彭振赟,胡锡炎,张磊,双对称矩阵的一类反问题,计算数学,1(2005),11-18
[20] Zhen-yun Peng and Xu-li Han, Constructing Jacobi matrices with prescribed ordered defective eigenpairs and a principal submatrix, Journal of Computational and Applied Mathematics, 175(2005), 321-333。SCI检索号:881WF
[21] Zhen-yun Peng,The Inverse eigenvalue Problem for Hermitian Anti-reflexive Matrices and Its Approximation, Applied Mathematics and Computation, 162:3(2005),1377-1389。SCI检索号:895KL
[22] Zhen-yun Peng,An iterative method for the least squares symmetric solution of the linear matrix equation AXB=C, Applied Mathematics and Computation, 170(2005),711-723。 SCI检索号:979TR
[23] Zhen-yun Peng, Yuan-bei Deng and Jin-wang Liu,Least-squares solutions of inverse problem for hermitian anti-reflexive matrices and its appoximation, Acta Mathematica Sinica, English Series, 22:2(2006), 477-484。SCI检索号:020RK
[24] Zhen-yun Peng and Ya-xin Peng,An iterative method for the matrix equation AXB+CYD=E, Numerical Linear Algebra with Applications, 13(2006), 473-485。SCI检索号:071XS
[25] Jin-jun Hou,Zhen-yun Peng and Xiang-lin Zhang,An iterative method for the least squares symmetric solution of matrix equation AXB = C,Numerical Algorithms, 42(2006) , 181–192。SCI检索号:078LR
[26] Zhen-yun Peng, Salah M. El-Sayed and Xiang-lin Zhang, Iterative methods for the extremal positive definite solution of the matrix equation X+A*X-aA=Q,Journal of Computational and Applied Mathematics,200(2007), 520-527。SCI检索号:137FX
[27] Zhen-yun Peng and Salah M. El-Sayed,On positive definite solution of a nonlinear matrix equation,Numerical Linear Algebra with Applications, 14 (2007), 99-113。SCI检索号:140UV
[28] Zhen-yun Peng,Solutions of symmetry constrained least squares problems,Numerical Linear Algebra with Applications, 15:4(2008), 373-389。SCI检索号:305EQ
[29] Zhen-yun Peng, The rank constrained symmetric solution of the matrix equation, Advances in Matrix Theory and its Applications(Proceedings of the Eighth International Conference on Matrix Theory and Its Applications in China), 2008, 196-199.
[30] Xuefeng Duan,Anping Liao, Zhenyun Peng,A fast reliable algorithm for solving the matrix X-A*XA=C,Proceedings 3rd International workshop on Matrix Analysis, Hangzhou P.R. China, July 9-13,2009, Vol.1, 98-101.
[31] Xuefeng Duan,Zhenyun Peng,Fujian Duan, Positive definite solutions of two kinds of nonlinear matrix equations, Surveys in Mathematics and its Applications, 4(2009), 179-190.
[32] 段雪峰,廖安平,彭振赟,矩阵方程 
的正定解,工程数学学报,26:4(2009), 757-759.
[33] Yabo Chen, Zhenyun Peng, Tiejun Zhou, LSQR iterative common symmetric solutions to matrix equations AXB = E and CXD = F, Applied Mathematics and Computation, 217(2010), 230-236. SCI检索号:634KU
[34] Chunmei Li, Xuefeng Duan, Zhenyun Peng, Thompson Metric Method for solving a quadratic matrix equation, Proceedings the ninth International Conference on Matrix Theory and its Applications, Shanghai, China, July 18-22, 2010, Vol.1, 105-108.
[35] Zhen-yun Peng,A matrix LSQR iterative method to solve matrix equation AXB=C,International Journal of Computer Mathematics,87(2010), 1820 – 1830。SCI检索号:623ZC
[36] Zhen-yun Peng,New matrix iterative methods for constraints solutions to matrix equation AXB=C,Journal of Computational and Applied Mathematics,235(2010),726-735。 SCI检索号:657DY
[37] Yangjun Ou, Zhenyun Peng, The solvability conditions for one kind of indefinite problems, Proceedings the ninth International Conference on Matrix Theory and its Applications, Shanghai, China, July 18-22, 14(2010), 142-145。
[38] 郭斌,彭振赟,下三角矩阵逆奇异值问题的递推算法,长沙大学学报,24:5(2010),7-8.
[39] 俞丽彬,彭振赟,一类中心(反)对称矩阵奇异值分解及其算法,leyu乐鱼(中国)官方网站学报,30:4(2010),343-345.
[40] 王文璞,彭振赟,一类矩阵不定问题有解的条件,计算机与自动化,29:3(2010),53-55.
[41] 俞丽彬,彭振赟,一类矩阵方程及其最佳逼近,leyu乐鱼(中国)官方网站学报,30:6(2010),609-613.
[42] 李春梅,彭振赟,段雪峰,一类Toeplitz矩阵的平方根,leyu乐鱼(中国)官方网站学报,31:1(2011),34-36.
[43] Zhen-yun Peng, Lin Wang, Jing-jing Peng, The Solutions of Matrix Equation AX=B Over a Matrix Inequality Constraint, SIAM Journal on Matrix Analysis and Applications, 33:2(2012), 554-568. SCI检索号:968PP
[44] Anbao Xu,Zhenyun Peng,Norm-constrained least-squares solutions to the matrix equation AXB=C,Proccedings of the seventh Workshop on matrices and Operators, Harbin, China,13-16 Huly,2012, 136-139.
[45] Fangying Li,Jingjing Peng,Zhenyun Peng,The least squares stochatic solutions of the matrix equation AX=B,Proccedings of the seventh Workshop on matrices and Operators, Harbin, China,13-16 Huly,2012, 140-144.
[46] Jingjing Peng,Zhenyun Peng,The symmetric solutions of the matrix inequality AX≥B in least-squares sense,International Journal of Computer Mathematics,3(2013),554-564. SCI检索,检索号:147QH No20
[47] Fangying Li,Jingjing Peng,Zhenyun Peng,The least squares stochatic solutions of the matrix equation AX=B,Journal of Algebra Number Theory:Advances and Applications, 12:8(2012),19-39.
[48] An-bao Xu,Zhenyun Peng, Norm-Constrained Least-Squares Solutions to the Matrix Equation AXB = C,Abstract and Applied Analysis, Art. ID 781276, DOI: 10.1155/2013/781276, 2013. SCI检索,检索号:194OQ No21
[48]、李姣芬,张晓宁,彭振赟,彭靖静,基于交替投影算法求解单变量线性约束矩阵方程问题,计算数学,36:2(2014),143-162.
[49]、李姣芬,彭振赟,彭靖静,矩阵不等式约束下矩阵方程AX=B的双对称解,计算数学,35:2(2013),137-150.
[50] 程可欣, 彭振赟, 杜丹丹, 肖宪伟, 矩阵方程 X − ATX−1A = Q的牛顿迭代解法, 工程数学学报,1(2016),63-72.
[51]Hongli Qu, Kexin Cheng, Zhenyun peng, Algorithms to compute the interval constrained solutions of the matrix AX=B, Far East Journal of Applied Mathematics, 89:1(2014),15-28.
[52] Kexin Cheng,Hongli Qu, Zhenyun Peng, The interval constrained solutions of the matrix equation (AX,XB)=(C,D), JP Journal of Algebra, Number Theory and Applications, 35:1(2014),67-80.